Apparatus and method for neural processing

ABSTRACT

The neural computing paradigm is characterized as a dynamic and highly computationally intensive system typically consisting of input weight multiplications, product summation, neural state calculations, and complete connectivity among the neurons. Herein is described neural network architecture for a Scalable Neural Array Process (SNAP) which uses a unique interconnection and communication scheme within an array structure that provides high performance for completely connected network models such as the Hopfield model. SNAP&#39;s packaging and expansion capabilities are addressed, demonstrating SNAP&#39;s scalability to larger networks. The array processor is made up of multiple sets of orthogonal interconnections and activity generators. Each activity generator is responsive to an output signal in order to generate a neuron value. The interconnection structure also uses special adder trees which respond in a first state to generate an output signal and in a second state to communicate a neuron value back to the input of the array processor.

The application is a continuation of application Ser. No. 07/740,568, filed Aug. 5, 1991, now abandoned which is a division of U.S. Ser. No. 07/526,866, filed May 22, 1990, now entitled "Orthogonal Row-Column Neural Processor", U.S. Pat. No. 5,065,339, issued Nov. 12, 1991.

BACKGROUND OF THE INVENTION

1. Technical Field

This invention relates to new and useful improvements in general purpose digital computing systems. More specifically, it relates to a neural network architecture which uses an intercommunication scheme within an array structure for a completely connected network model

2. Background Information

The neural computing paradigm is characterized as a dynamic and highly parallel computationally intensive system typically consisting of input weight multiplications, product summation, neural state calculations, and complete connectivity among the neurons

Most artificial neural systems (ANS) in commercial use are modeled on von Neumahn computers. This allows the processing algorithms to be easily changed and different network structures implemented, but at a cost of slow execution rates for even the most modestly sized network As a consequence, some parallel structures supporting neural networks have been developed in which the processing elements emulate the operation of neurons to the extent required by the system model and may deviate from present knowledge of actual neuron functioning to suit the application.

An example of the typical computational tasks required by a neural network processing element may be represented by a subset of the full Parallel Distributed Processing model described by D. E. Rumelhart, J. L. McClelland, and the PDP Research Group, Parallel Distributed Processing Vol. 1: Foundations, Cambridge, Mass., MIT Press, 1986. A network of such processing elements, or neurons, is described in J. J. Hopfield, "neurons With Graded Response Have Collective Computational Properties Like Those of Two-State Neurons," Proceedings of the National Academy of Sciences 81, pp. 3088-3092, May 1984. This processing unit in illustrated in FIG. 1 and Table 1.

Referring to FIGS. 1, neural network processing unit, or neuron 40, typically includes processing tasks, including input function I_(i) 44 and activity function Y_(i) 42, and connectivity network 46, 48 which, in the worst case, connects each such neuron to every other neuron including itself.

Activity function Y_(i) 42 may be a nonlinear function of the type referred to as a sigmoid function. Other examples of activity function Y_(i) 42 include threshold functions, probabilistic functions, and so forth. A network of such nonlinear sigmoid processing elements 40 represents a dynamic system which can be simulated on a digital processor. From a mathematical perspective, nonlinear dynamic models of neurons can be digitally simulated by taking the derivative of the nonlinear equations governing the neurons functions with respect to time and then using numerical differentiation techniques to compute the function. This mathematical basis allows mapping the nonlinear continuous functions of neural networks onto digital representations. In discrete time steps, input function I_(i) multiplies digital weight values W_(ij) by digital signal values, Y_(j), on each neuron input and then form a sum of these product's digital values. The input to the activity function Y_(i) is the output I_(i) and its output, in this case, is activity function Y_(i) directly; alternatively, the output could be some function Y_(i).

The accuracy of the nonlinear digital simulation of a neural network depends upon the precision of the weights, neuron values, product, sum of product, and activity values, and the size of the time step utilized for simulation. The . precision required for a particular simulation is problem dependent. The time step size can be treated as a multiplication factor incorporated into the activation function. The neurons in a network may all possess the same functions, but this is not required.

Neurons modeled on a neural processor may be simulated in a "direct" and/or a "virtual" implementation. In a direct method, each neuron has a physical processing element (PE) available which may operate simultaneously in parallel with the other neuron PE's active in the system. In a "virtual" implementation, multiple neurons are assigned to individual hardware processing elements (PE's), which requires that a PE's processing be shared across its "virtual" neurons. The performance of the network will be greater under the "direct" approach but most prior art artificial neural systems utilize the "virtual" neuron concept, due architecture and technology limitations.

Two major problems in a "direct" implementation of neural networks are the interconnection network between neurons and the computational speed of a neuron function. First, in an artificial neural system with a large number of neurons (processing units, or PE's), the method of connecting the PE's becomes critical to performance as well as cost. In a physical implementation of such direct systems, complete connectivity is a requirement difficult if not impossible to achieve due to the very large number of interconnection lines required Second, the neural processing load includes a massive number of parallel computations which must be done for the "weighting" of the input signals to each neuron.

The relatively large size of the neural processing load can be illustrated with respect to a 64×64 element Hopfield network (supra), completely connected with symmetrical weights. Such a network has 64×64=4,096 neurons which, for a fully interconnected network, has 4096×4096 or approximately 16×10⁶ weight values A 128×128 element Hopfield network has 128×128=16,384 neurons with 256×10⁶ weights. A sum of the weights times neuron input values across all neurons provides the input to each neuron's activation function, such as the sigmoid activation function previously described. Each computation contributes to the overall processing load which must be completed for all neurons every updating cycle of the network.

One structure for implementing neural computers is a ring systolic array. A systolic array is a network of processors which rhythmically compute and pass data through a system. One example of a systolic array for implementing a neural computer is the pipelined array architecture described by S. Y. Kung and J. N. Hwang, "A Unified Systolic Architecture for Artificial Neural Networks," Journal of Parallel and Distributed Computing 6, pp. 358-387, 1989, and illustrated in FIG. 2 and Table 2. In this structure each PE 50, 52, . . . , 54 is treated as a neuron, labeled Y_(i). Each neuron contains the weight storage 51, 53, . . . , 55 for that neuron with the weights stored in a circular shifted order which corresponds to the j^(th) neuron values as they are linearly shifted from PE to PE. Assuming the initial neuron values and weights have been preloaded into PEs 50, 52, . . . , 54 from a host, the network update cycle computes the I_(i) (steps 1 through 7) and Y_(i) (step 8) values, as shown in Table 2. In this fashion a neural network can be modeled on a systolic array.

The ring systolic array architecture (FIG. 2 and Table 2) has the following performance characteristics assuming overlapped operations:

    SYSTOLIC RING period=Nδ.sub.M +δ.sub.Λ +δ.sub.bus +δ.sub.S                                            ( 1)

where the following delay variables are used, representing the delay through each named element:

δ_(M) =Multiplier delay.

δ.sub.Λ =Communicating Adder: 2-1 add stage delay.

δ_(S) =Sigmoid generator delay.

δ_(BUS) =Communicating Adder: communications bypass stage delay.

and N represents the total number of neurons.

It is an object of this invention to provide an improved array processor apparatus and method.

It is a further object of this invention to provide an improved neural system architecture and method.

It is a further object of this invention to provide an artificial neural system which provides improved direct modeling of large neural networks

It is a further object of this invention to provide an improved interconnection network for simplifying the physical complexity of a neural array characterized by total connectivity.

It is a further object of this invention to provide an improved neural array architecture and method adapted for efficient distribution over a plurality of interconnected semi-conductor chips.

SUMMARY OF THE INVENTION

In accordance with the apparatus of the invention, an array processor comprises a plurality of input function elements, with each input function element selectively allocated to a set of neurons, and each neuron including means for generating a neuron value from a selected set of input function elements and for communicating said neuron value back to said selected set of input function elements.

In accordance with the apparatus and method of this invention, the total connectivity of each neuron to all neurons, including itself, is accomplished by an orthogonal relationship of neurons: that is, a given multiplier element operates during a first cycle as a row element within an input function to a column neuron, and during a second cycle as a column element within an input function to a row neuron.

In accordance with the method of the invention, an array processor comprising orthogonal sets of neurons and a plurality of input function elements, is operated according to the method comprising the steps of (1) operating a first neuron upon a first subset of said input functions to generate and load back into said first subset a neuron value, and (2) allocating each of said first subset of input function elements to one of a set of orthogonal neurons.

BRIEF DESCRIPTION OF THE DRAWINGS

The above and other objects, features and advantages of the invention will be more fully appreciated with reference to the accompanying Figures, in which:

FIG. 1 is a schematic representation of a typical neuron function.

FIG. 2 is a schematic representation of a prior art ring systolic array.

FIG. 3 is a schematic representation of a four neuron array illustrating total connectivity.

FIGS. 4A and 4B are symbolic and schematic representations of a communicating adder designed according to the invention.

FIGS. 5A and 5B are symbolic and schematic representations of multiplier designed according to the invention.

FIGS. 6A and 6B are symbolic and schematic representations of an activity function generator (herein, a sigmoid generator) designed according to the invention.

FIG. 7 is a schematic representation illustrating the interconnection of communicating adders, multipliers, and sigmoid generators to form a four neuron matrix.

FIGS. 8 thru 15 are a schematic representation showing the states of selected elements of the four neuron matrix of FIG. 7 through two neuron update cycles of operation.

FIG. 16 is a timing diagram for the bit serial embodiment of the invention.

FIG. 17 is a schematic representation of a physical layout structure for the packaging and wiring of a neuron matrix.

FIGS. 18, 18A and 18B are a schematic representation of a multiplier quadrant of a sixteen neuron matrix.

FIG. 19 is a schematic representation of a physical layout structure for the packaging and wiring of a neuron matrix having multiplier array chips and neuron activation function chips.

FIGS. 20A and 20B are symbolic and schematic representations of an embodiment of the neuron activation function chips of the neuron matrix of FIG. 19.

FIG. 21 is a schematic block diagram illustrating the neural array network of the invention within a host environment.

FIG. 22 is a schematic representation of the row scalability embodiment of the invention showing the use of an iterative adder.

FIG. 23 is a schematic block diagram of the iterative adder of FIG. 22.

FIG. 24 is a schematic block diagram of the dual path adder embodiment of the invention.

FIGS. 25A and 25B are schematic block diagrams of the multiple function, illustrating another aspect of the dual path adder embodiment of the invention.

FIGS. 26A and 26B are schematic block diagrams of the sigmoid, or activation, function for the row scalability embodiment of FIG. 22.

FIG. 27 is a schematic block diagram of an example of a multiplier chip for row scalability.

FIG. 28 is a schematic representation illustrating an example of a multiplier array chip for a row scalability embodiment of the invention, using a two row building block for an N=1024 neuron system.

FIG. 29 is a schematic representation of a three dimensional embodiment of the invention for a four neuron SNAP.

FIG. 30 is a schematic block diagram of the three dimensional, four neuron SNAP embodiment of FIG. 29.

FIG. 31 is a schematic representation of neuron input values through two update cycles of operation of the three dimensional, four neuron SNAP embodiment of FIGS. 29 and 30.

DESCRIPTION OF THE PREFERRED EMBODIMENTS

This invention relates to a neural processor including orthogonal sets of neuron elements and provision for transporting neuron values between elements. A neuron comprises (1) an input function, typically a set of input function elements, or multiplier elements each responsive to an input value and a weight value to provide a weighted output, (2) a combination or reduction function, typically an adder tree for combining the weighted outputs from the multiplier elements into a single value, and (3) an activation function responsive to the single value for generating the neuron output. In the worst case, of total connectivity, each of the neurons in an N×N array of neurons is connected to communicate its neuron output as an input value to all neurons, including itself--and thus would have a set of N multiplier elements at its input function. In accordance with a preferred embodiment of this invention, the combination function includes a reverse communication path for communicating the neuron output back just to its own input function Alternatively, a separate communication path may be provided. The total connectivity of each neuron to all neurons, including itself, is accomplished by the orthogonal relationship of neurons: that is, a given multiplier element operates during a first cycle as a row element within an input function to a column neuron, and during a second cycle as a column element within an input function to a row neuron.

The four basic operations generally implemented by a neural computer simulating a completely connected N neuron network are:

1. N² Multiplications

2. N Product Summations

3. N Activation Functions

4. N×N Communications

As will be hereafter described, in accordance with a preferred embodiment of the invention, the architecture of a scalable neural array processor (also referred to as SNAP) provides the N² multiplications by utilizing N² multipliers, the N product summations by tree structures, the N activation functions by utilizing separate activation function modules, and the N×N communications by a reverse path mechanism included within adder tree structures.

In connection with preferred embodiments of the invention hereinafter described, the function implemented by the neural processor is: ##EQU1## Where: N is the number of neurons, F(x) is the neuron activation function which in a preferred embodiment is set equal to a sigmoid activation function whose form can be: ##EQU2## And Where: The subscripts on the weights W such as W₁₃ represent the weight of the connection between neurons, in this example from Neuron 3 to Neuron 1.

In the embodiments of the invention to be hereafter described, it is assumed that the weights are fixed for the duration of the network execution. However, as these weights are loadable from a host computer, learning algorithms may be implemented at the host and weight updating provided. Further, referring to FIG. 21, in the preferred embodiments of the invention to be hereafter described, host computer 30 also initializes network 32 architectures by (1) loading (a) the number of neurons in the network to be simulated by the architecture, (b) all the connection weights, (c) the initial neuron values, and (d) the number of network update cycles to be run, (2) starting the model into execution, and (3) reading the neuron values at the completion of network execution.

Hereafter, in assessing and comparing the performance of various neural processing architectures, only performance during execution is considered, and not the initialization time and the host processing time.

In accordance with a preferred embodiment of the invention, a multiplier and adder tree array structure to be described provides a means for transporting neuron values between the neuron elements. The interpretation of equation 2 for this embodiment of SNAP is based on noting that for each neuron i there is a weight multiplication with the same Y_(j) input but with different weights. This is seen by expanding equation 2 for each neuron value and comparing the equations for the multiple neuron outputs. For example, the N neuron outputs formed from equation 2 are as follows: ##EQU3## Referring to FIG. 3, as an example, a four (N=4) neuron array with N² interconnections is shown, illustrating the principle of total connectivity (and the almost impossibility of physically realizing an N neuron matrix as N becomes much larger.) Herein, neuron 60 comprises adder tree 62, multipliers 64, 66, 68, 70, and sigmoid generator 72. This neuron structure is replicated, forming three more neurons 90, 92, 94, in which sigmoid generators 74, 76, 78 are associated with adder trees 80, 82, 84, respectively, and multiplier circuits 91, 93, 95, 97, 61, 63, 65, 67, 71, 73, 75, 77, as shown. The output value Y2' from sigmoid generator 74 of neuron 90 is fed back (that is, interconnected by data paths 69) to the inputs to multipliers 66, 93, 63, and 73, which form the second row of a four by four multiplier matrix. The output value Y3' from sigmoid generator 76 of neuron 92 is fed back (interconnected by data paths 79) to the inputs to multipliers 68, 95, 65, and 75, which form the third row of the four by four multiplier matrix. While not shown, the outputs Y1' and Y4' of sigmoid generators 72 and 78 of neurons 60 and 94, respectively, are fed back (interconnected) to the inputs of multipliers 64, 91, 61, and 71 forming the first row of the multiplier matrix, and to multipliers 70, 97, 67, and 77 forming the fourth row of the matrix, respectively. Herein, the weights and neuron values are represented by some arbitrary number of bits on the data communication paths reflecting the precision of the value, for example a 16 or 32 bit representation, and these values can be produced and communicated in parallel or serial fashion.

Assuming the Y_(j) inputs (such as Y1, Y2, Y3, and Y4) and their associated weights are separately available and there are N separate parallel multipliers (such as multipliers 64, 66, 68, 70) then for a given neuron "i" (such as neuron 60), N products can be formed in parallel (at the outputs of multipliers 64, 66, 68, 70) in one multiplier delay time. These N products are then added together using 2 to 1 adders arranged in a tree structure (such as adder tree 62) to form a final summation X which is passed to the F(X) unit (such as sigmoid generator 72) to produce the i^(th) neuron output (such as Y1'). With N neurons (such as 60, 90, 92, 94) of this type, N neuron values (such as interconnected neuron values Y1', Y2', Y3', Y4') can be produced.

As the output of each neuron is interconnected to the input of all other neurons in the matrix, including itself, the N neurons 60, 90, 92, 94 of FIG. 3 require N² connections 69, 79, . . . , which, as N increases, is difficult if not impossible to physically realize

In accordance with the present invention, in order to achieve the completely interconnected structure in SNAP, as required by equation 2 but without the difficulties presented by the interconnection scheme set forth in FIG. 3, a novel method of transporting the neuron values is provided. This is accomplished through the use in a matrix of orthogonal neurons (to be hereinafter described in connection with the four neuron SNAP of FIG. 7) of the SNAP adder tree of FIGS. 4A, 4B, the SNAP multiplier of FIGS. 5A, 5B, and the SNAP sigmoid generator cf FIGS. 6A, 6B. Herein, a pair of neurons are orthogonal if they time share an input function element. Other interconnection networks can be utilized provided they have the attribute of reducing a plurality of inputs to one value, which value is communicated back to the inputs, as is described hereafter in the SNAP adder tree example of FIGS. 4A, 4B.

Referring to FIG. 4A, a symbolic representation of the adder tree 108 of the invention is provided, with the 2-1 adders designated by the letter A.

Referring to FIG. 4B, the more detailed representation of the adder tree 108 of the SNAP is shown. Three SNAP 2-1 adder elements 120, 122, 124 are shown in a 2 stage pipelined tree arrangement. Output stage 110 2-1 adder element 124 has Driver-1, DRVR1, block 126 on its output and two Driver-2, DRVR2, blocks 128, 130 bypassing adder 124, but in a reverse direction. Drivers 126, 128, 130 are responsive to enable/disable signals (generated by state control 34 of FIG. 21) which, when in the disable state, keeps the driver output in a high impedance state and when in the enable state turns the driver into a non-inverting buffer. When DRVR1 block 126 is enabled DRVR2 blocks 128, 130 are disabled and visa versa. This structure is replicated at the input stage, with both input adders 116, 118 having outputs 112, 114, respectively, forming the inputs to output stage 110. In this manner the adder tree can provide the summation function in one direction, DRVR1's enabled--DRVR2's disabled, while essentially acting as a communication path in the reverse direction, DRVR1's disabled--DRVR2's enabled. Alternatively, a separate reverse communication path can be utilized, as hereinafter described in connection with FIG. 24. Also, pipeline latches (not shown) would generally be provided on the inputs to the adders.

An adder tree (such as 108) using 2 to 1 adders (such as adders 120, 122, 124) will require Log₂ N adder stages. It should be noted that SNAP's communicating adder 108 represents its logical function since, for example, depending upon technology, the DRVR1 126 function could be incorporated in the gate devices required by each of adders 110, 116, 118 thereby adding no additional delay to the add function. Alternatively, and in the general sense, the forward summation and reverse communication path may be implemented with 2 to 1, 3 to 1, . . . , N to 1 adders, or combinations thereof. Also, in the general sense, the summation function may be any function (Boolean or arithmetic, or combination thereof) which converges a plurality of inputs to an output value.

Referring to FIGS. 5A and 5B, SNAP's multiplier 160 is designed to work with communicating adder 108. Storage is provided in register 162 for the neuron values and in register 164 for their associated weights. The Equation (2) Y_(j) and W_(ij) values, or operands, are initialized from the HOST computer into registers 162, 164, respectively, and are inputs to multiplier 166. The Y_(j) values in register 162 after initialization are received from the communicating adder along path 170 when it is in communicating mode; that is, DRVR1s 126, 168, . . . , disabled and DRVR2s 128, 130, . . . , enabled. While block 166 is here shown as a multiplier, the invention is not so restricted, and alternative functions may therein be provided for generating an output function to driver 168 within the scope of the invention.

Referring to FIGS. 6A and 6B, SNAP sigmoid generator 180 also works with communicating adder 108 by first calculating in generator block 182 and storing in register 184 the neuron value Y_(i) from the summation of weighted inputs, DRVR1s enabled--DRVR2s disabled and second by passing the generated neuron Y value in reverse fashion, DRVR1s disabled--DRVR2s enabled, back through adder 108 to be received by multiplier 160. As previously noted, functions other than a sigmoid function may be implemented in activation function block 180 without departing from the spirit of the invention.

Referring now to FIG. 7, a four neuron SNAP matrix in accordance with a preferred embodiment of the invention is set forth. In the embodiment of FIG. 7, the arrangement of FIG. 3 is modified by a structure in addition to those of FIGS. 4 through 6 in order to make use of the communication path of this embodiment of the invention through the adder tree. This additional structure is another set of N communicating adder trees (one being represented by adder tree 232) with Sigmoid generators 220, 222, 224, 226 placed orthogonal to a first set 210, 212, 214, 216. FIG. 7 shows these additional N structures in a 4 neuron SNAP. The added horizontal structures, or row sections, including communicating adder trees 232, etc., and activation, or sigmoid, generators 220, 222, 224, 226 are exactly the same as the vertical structures previously described in connection with FIGS. 4, 5, and 6, with the exception that there are new driver enable/disable signals (not shown) required for the row sections In FIGS. 7 thru 15, for simplicity in explanation, the vertical column adder trees (such as adder 230) and associated Sigmoid generator (such as sigmoid generator 210) are labeled with a lower case v, for vertical, while the horizontal adder trees (such as 232) and their associated sigmoid generators (such as 224) are labeled with a lower case h, for horizontal. Similarly, references to drivers DRVR1 and DRVR2 associated with vertical adder tree as and corresponding sigmoid generators (even though not specifically shown in FIGS. 7-15) will be identified with a lower case v. Similarly, drivers associated with horizontal trees and generators are identified by lower case h. Herein, each input function block, such as multiplier 246, is associated with orthogonal neurons: that is, allocated in a time shared manner to one vertical neuron 230 and one horizontal neuron 232, in a manner now to be described.

Referring now to FIGS. 8 thru 15, a description of several states of the four neuron SNAP of FIG. 7 are presented for two cycles of update operation in accordance with a preferred embodiment of the method of the invention. In each of FIGS. 8 thru 15, asterisks are used to illustrate the function being performed in the respective process steps or states. The matrices of FIGS. 8 through 15 correspond to FIG. 7, simplified by not including the data path lines, with horizontal adder tree 232 (and, similarly, adder trees 286, 288 and 290) represented by horizontal bars, and vertical adder tree 230 (and, similarly, adder trees 280, 282 and 284) represented by vertical bars. For clarity of explanation, in FIGS. 9 through 15, selected active elements are identified by reference numerals.

The matrix of FIGS. 7 and 8 is initialized, herein, by the host loading the weights (FIGS. 1 and 5B) and first neuron values Y1, Y2, Y3, Y4 into the multiplier registers 162, 164 (FIG. 5B) of each column. Thereafter, the SNAP structure of the invention operates as follows.

Step 1: MULTIPLY. Referring to FIG. 8, neuron values Y_(i) are multiplied by weights W_(ij) in parallel in multipliers 240, 242, . . . , 250, . . ., 278.

Step 2: VERTICAL FORWARD Referring to FIG. 9, vertical column adder trees 230, 280, 282, 284 are opera-ed with DRVR1vs enabled, and DRVR2vs, DRVR1hs and DRVR2hs disabled to combine, herein provide the summation, of the weighted neuron values. (In this description of FIGS. 7 thru 15, the "s", such as is used in "DRVR1vs", designates the plural.)

Step 3: GENERATE VERTICAL. Referring to FIG. 10, vertical activation functions, herein sigmoid generators 210, 212, 214, 216 produce the vertical neuron values, Y_(i) vs: Y1', Y2', Y3', Y4'.

Step 4: VERTICAL REVERSE. Referring to FIG. 11, vertical adder trees 230, 280, 282, 284 are operated with DRVR2vs enabled, and DRVR1vs, DRVR1hs, and DRVR2hs disabled to communicate the Y_(i) vs back to the input registers 162 (FIG. 5B) of multipliers 240, 242, . . . , 250, . . . , 278.

This completes the first update cycle, such that the input values Y1, Y2, Y3, Y4 initialized down the columns have been modified and positioned across the rows of the matrix as values Y1', Y2', YE', Y4', respectively.

Step 5: MULTIPLY VERTICAL. Referring to FIG. 12 in connection with FIG. 5B, vertical neuron values Y_(i) v (in registers 162) are multiplied (multiplier 166) by weights W_(ij) (in registers 164).

Step 6: HORIZONTAL FORWARD Referring to FIG. 13 in connection with FIG. 4B, horizontal adder trees 232, 286, 288, 290 are operated with DRVR1hs enabled, and DRVR2hs, DRVR1vs, and DRVR2vs disabled to produce the summation 171 of the weighted neuron values.

Step 7: GENERATE HORIZONTAL. Referring to FIG. 14 in connection with FIG. 6B, horizontal sigmoid generators 220, 222, 224, 226 produce Y hs Y1'', Y2'', Y3'' Y4''.

Step 8: HORIZONTAL REVERSE Referring to FIG. 15, horizontal adder trees 232, 286, 288, 290 are operated with DRVR2hs enabled, and DRVR1hs, DRVR1vs, and DRVR2vs disabled to communicate the Y hs Y1'', Y2'', Y3'' Y4'' back to the input registers of multipliers 240, 242, . . . , 250 , . . . , 278.

This completes the second update cycle, such that the original input values Y1, Y2, Y3, Y4, now twice modified, appear as Y1'', Y2'', Y3'', Y4'' positioned down the columns.

Steps 1 through 8 are repeated until a host specified number of iterations have been completed.

To evaluate the performance of the SNAP architecture with respect to the objects of the invention the following delay variables are used, representing the delay through each named element:

δ_(M) =Multiplier delay.

δ.sub.Λ =Communicating Adder: 2-1 add stage delay.

δ_(S) =Sigmoid generator delay.

δ_(B) =Communicating Adder: communications bypass stage delay.

And the following general assumptions noted:

1. The system defined clock period is C, with all delays specified as multiples of C.

2. In this embodiment of SNAP, 2 to 1 adders are used in the summation tree function with log₂ N additional stages, where N is the total number of neurons being simulated and is equal to the number of neuron inputs

The performance of the SNAP architecture may be represented by the time required for generating the neuron outputs Since SNAP, as with the ring systolic array, is based on recursive equation 2, the computation of Y_(i) (t+1) cannot begin before the previous Y_(i) (t) values have been calculated and received at the input In this example, the multiply and sigmoid functions are not pipelined, but require their inputs to be held constant for the whole multiplier or sigmoid delay. (Of course, they could be pipelined.) For the safeness of the structure and performance reasons, it is desired that the values for a computation are present in the inputs of the various functional units when required and that the input logic and weight access operate in parallel with the multiply operations, i.e. in pipelined mode. In order to achieve safeness with no additional delays, each operation must follow in sequence at the completion of the previous operation, as follows:

1. Multiply,

2. Add tree,

3. Sigmoid generator, and

4. Communication tree.

This sequence of events requires a simple control mechanism such as the use of a counter whose output value is compared against delay values representing the listed events, namely: the multiplier delay, the log₂ N communicating adder tree--add mode delay, the sigmoid delay, and the log₂ N communicating adder tree--communications mode delay. When a delay match occurs the next event in sequence is started. Assuming this control sequence is followed the period between neuron values is:

    SNAP period=δ.sub.M +(log.sub.2 /N)δ.sub.Λ +δ.sub.S +(log.sub.2 N)δ.sub.B

Assuming δ.sub.Λ =δ_(B) =1C, a reasonable assumption, then SNAP's period is:

    SNAP period=δ.sub.M +2(log.sub.2 /N)C+δ.sub.S

An assumption up to this point has been that the weights and neuron values are represented by some arbitrary number of bits reflecting the precision of the value, for example a 16 or 32 bit representation. The value representation choice can greatly limit the physical implementation of SNAP as each multiplier in the array must support the representation. N² 32 bit multipliers, for example, would greatly limit the number of neurons, N, supported by the physical implementation. In line with this design issue, is the question of how much precision is required by the neural network problem being mapped onto the SNAP implementation. The amount of precision seems to be problem specific, consequently a desirable feature for the SNAP architecture would be to allow user specified precision as required by the application. Using a bit serial approach with programmable specified bit length solves not only the user selectable precision issue but also greatly eases the physical implementation. Each multiplier's weight and Y_(j) registers function as variable length shift registers where the bit length L of the operands is programmable from the host. The multipliers provide bit serial multiplication, with L or 2L bits of precision, injecting the result bits into the communicating adder, which is also of bit serial design. For examples of bit serial multiplier designs, see Lyon, R.F., "Two's Complement Pipeline Multipliers", IEEE Transactions on Communications, April 1976, pp. 418, 425, the teachings of which are incorporated herein by this reference. The sigmoid generator must either be of bit serial design or be able to handle variable length sum of product values.

Referring to FIG. 16, for the case where the multiplier provides L bits of precision, the sigmoid generator is not bit serialized, but rather processes a sum of product input of length L, the bit serial SNAP period is:

    Bit Serial SNAP period=2(log.sub.2 N)C+2(L)C+δ.sub.S

Referring to FIG. 17, in accordance with an embodiment of the invention providing a physical layout structure having advantageous packaging and wiring characteristics for arrays of large N, the N×N array of multipliers is partitioned into four quadrants, each representing N/2×N/2 multipliers with adder trees, with sigmoid generators placed horizontally and vertically between the quadrants.

Referring to FIG. 18, for example, one of the four neuron SNAP multiplier quadrants of the array structure of FIG. 17 is shown. In FIG. 18, capital letter A indicates a 2 to 1 adder. These are arranged as horizontal and vertical adder trees, such as 300, 302, respectively, as described in connection with FIG. 4A. Multiplier cells M are as described in connection with FIG. 5A. Larger arrays utilize the same building blocks yielding a space and wiring efficient matrix. For the larger arrays the number of wire crossings for the adder tree data paths is not more than log₂ (N/2) in both horizontal and vertical wiring channels. Sigmoid generators 310 through 324 are provided on the rows, and 330 through 344 on the columns, of the matrix.

Referring now to FIG. 19, an example of a packaging scheme for the SNAP architecture of the invention will be described. Herein, two different types of chips are used, one being multiplier array M-CHIPs 400 through 436, of the form shown in FIG. 18, and the second being neuron activation function chips 440, 442, 444, 446, including input communicating adder trees 460, 462, 464, 466, respectively, for each SIG1v. . .SIG-Nv, and SIG1h . . . SIG-Nh, such as 450 through 456. In this example packaging scheme, to allow for expansion, SIG chip input communicating adder trees 460 through 466 are each modified slightly, as shown in FIGS. 20A and 20B.

Referring to FIG. 20B, additional drivers, DRVR3, such as 480, 482, have been added to adder stages 484, 486, allowing adder stages, such as 120, to be bypassed under control of state definition control 34 (FIG. 21) in a forward direction in a similar manner to the bypass of adders, such as adder 124, provided in the reverse direction by DRVR2s 128, 130. An adder stage is bypassed in the forward direction when that stage is not required by the system being built. In a smaller system, chips are connected and input adder stages are bypassed such that the chips used connect to the correct level in the adder tree. With the SIG chip example of FIG. 20 containing three adder stages 484, 486, 488, two different systems can be built, one with one M-CHIP per quadrant and the second with four M-CHIPs, such as 400, 402, 404, 406 per quadrant as shown in FIG. 19. Of course larger input trees can be designed into the SIG chip allowing much greater growth. This is not a particular chip I/O problem since the connections to the adder tree may be bit serial. With this scheme the expansion must be done by a factor of four within each quadrant in order to keep a symmetric N/2×N/2 relationship within the quadrant. For examples see Table 3.

Referring to FIG. 21, host 30 is shown in two way communication with scalable neural array processor 32, which includes various drivers, such as DRVR1, DRVR2, DRVR3 all responsive to enable/disable state definition control 34 in accordance with the protocols herein described.

Referring to FIG. 22, a row scalability embodiment of the invention will be described. In this embodiment, provision is made for processing an N by N neural array matrix less than N rows at a time; in this example, two rows at a time. Thus, two rows 500, 502, each N multipliers 504, 506 long, have iterative adders 508, 510, . . . , 512 installed on the outputs of vertical communicating adder trees 514, 516, . . . , 518, respectively.

Referring to FIG. 23, iterative adder 512, for example, comprises adder 520 and storage register 522. Iterative adder 512 accumulates in register 522 partial summations from vertical communicating adder tree 518 as column 518 is cycled N/#Rows times until the final summation is formed and then supplied to Sigmoid generator 524. Similarly, iterative adders 508 and 510 accumulate the partial sums from adder trees 514, 516 respectively, two rows 500, 502 (#Rows) at a time, and provide the final summation to activation (Sigmoid) functions 526, 528, respectively. After these column summations are completed, N neuron values are generated by activation functions 524, 526, 528, . . . , and communicated back up adder trees 514, 516, . . . , 518 to horizontal adder trees 500, 502, as will be described hereafter in connection with FIGS. 24 through 26.

Referring to FIG. 24, vertical adder tree 518 (see FIG. 22) is shown in accordance with the dual path embodiment of the invention. Herein, for performance reasons and in contrast to adder tree 108 (FIG. 4B), separate reverse communication paths 530, 531, 532, 534, 536 are provided from sigmoid 524 register 570 (FIG. 26B) output Y_(N) back to multipliers 504, 506, . . .. (While four reverse communication paths 530 through 536 are shown in FIG. 24, only two would be required for the two-row at a time embodiment of FIG. 23.) Depending upon the size of tree 108, and the technology used, drivers DRVR2 538, 540 are used on the reverse communication paths 530 through 536 to handle the loading. While reverse communication paths 530, 532, 534, 536 are shown following adder tree paths 540 through 550, this is not necessary, as their destinations are input registers 564 (FIG. 25B) to multipliers, such as 504, 506.

Referring to FIGS. 25 and 26, multipliers 504, 506 and sigmoid generator 524 are modified by providing lines 560, 562 to allow for this separate reverse communication path.

Referring to FIG. 25B, multiplication function 504; for example, stores N/#Rows of neuron values and associated weights in Y value stack 564 and weight stack 566, respectively. Stacks 564, 566 store N/#Rows of neuron values in a first-in first-out arrangement. Similarly, referring to FIG. 26B, as each row 500, 502 must be cycled N/#Rows times, Sigmoid generator 524 (FIG. 26A) includes register 570 and thus is of pipelined design to allow for overlapped operations.

Referring to FIG. 27 in connection with FIG. 22, a row scalability embodiment of the invention is illustrated wherein two rows represent minimum building block for 2×128 multiplier array chip 601 with 2-7 stage dual path adders, one per row 500, 502, and 128 one stage adders 591 593, one per column 514, . . . , 518, used to create an N=1024 neuron system. Lines Row-1(xxx)h 590 are the outputs of seven stage communicating adders 592 for first row 500, replicated at lines 594 and adders 596 for second row 502. Herein, column output partial sum lines PS1, PS2, PS3, . . . , PS128 are provided, each for connecting to iterative adders 508, 510, . . . , 512 in a sigmoid generator chip with the input tree bypassed. Expansion is done by adding rows to the system and connecting the sigmoid generator chips as shown in FIG. 28.

The performance of SNAP with row scalability is not symmetric as would be expected with a period associated with the column Y_(i) production and a different period associated with the row Y_(i) production. ##EQU4## As rows are added the performance becomes more symmetric and with N columns×N rows, equals the performance of SNAP without row scalability, as previously discussed.

Referring to FIGS. 29 and 30, the the SNAP orthogonal switching concept of the invention is extended from the two dimensional row/column switch in neuron definition to a three dimensional stretch between planes of neurons. In the cube like structure 640 of FIG. 29, four planes 642, 644, 646, 648 each represent one of the neurons in a four neuron network. Add convergence is illustrated by four pyramid like structures 650, 652, 654, 656, one for each neuron, comprising 2 to 1 adder elements. Thus, sidel 642 represents a first neuron, including input elements 660, 662, 664, 666 initialized to values Y1, Y2, Y3, Y4, respectively. During a first cycle of operation, the first neuron value Y1' is generated and loaded back into input elements 660, 662, 664, 666. During a second cycle, the Y1' value from input element 660, the Y2' value from input element 670, and Y3' and Y4' values from corresponding input elements from side3 646 and side4 648 are fed to sigmoid generator 700 to produce value Y1''. In FIGS. 30 and 31, the cube structure of FIG. 29 is unfolded to illustrate a four-neuron snap through two update cycles. The concept of orthogonality is preserved in this embodiment, inasmuch as each input element, such as element 660, is time shared between two neurons, in this case a first neuron comprising input elements 660, 662, 664, 666 and a second neuron comprising input elements 660, 670, . . . .

By using the communicating adder tree, as herein described, or any similar interconnection structure, and the SNAP structure of the invention, the inherent limitations of the N² connections is greatly minimized allowing a regular structure for expandability while still keeping complete interconnectivity. Furthermore the performance impact of the required N² communications is log₂ N, which is a small impact as N increases.

In Table 4, a summary performance evaluation and comparison with alternate architectures is set forth, including hardware cost and performance comparison between the SNAP, BIT SERIAL SNAP, and SNAP ROW architectures of the invention, and the SYSTOLIC RING architecture of the prior art.

While preferred embodiments of the invention have been illustrated and described, it is to be understood that such does not limit the invention to the precise constructions herein disclosed, and the right is reserved to all changes and modifications coming within the scope of the invention as defined in the appended claims.

                  TABLE 1                                                          ______________________________________                                         NEURAL NETWORK COMPUTATION EXAMPLE                                             ______________________________________                                         INPUT FUNCTION Ii                                                                           ##STR1##                                                          ACTIVITY FUNCTION Yi(t)                                                                     ##STR2##                                                          NETWORK     FULL CONNECTIVITY - EACH                                           CONNECTIVITY                                                                               NEURON CONNECTS TO EVERY                                                       OTHER NEURON INCLUDING                                                         ITSELF.                                                            ______________________________________                                    

                                      TABLE 2                                      __________________________________________________________________________     OPERATION SEQUENCE FOR RING SYSTOLIC ARRAY                                     ARCHITECTURE FOR NEURAL NETWORKS                                               PE-1            PE-2             PE-N                                          __________________________________________________________________________     1 Y1*W11        Y2*W22        . . .                                                                             YN*WNN                                        2 ACC1 - Y1*W11 ACC2 = Y2*W22 . . .                                                                             ACCN = YN*WNN                                 3 PE-1 ← Y2                                                                               PE-2 ← Y3                                                                               . . .                                                                             PE-N ← Y1                                4 Y2*W12        Y3*W23        . . .                                                                             Y1*WN1                                        5 ACC1 = ACC1 + Y2*W12                                                                         ACC2 = ACC2 + Y3*W23                                                                         . . .                                                                             ACCN = ACCN + Y1*WN1                          6 PE-1 ← Y3                                                                               PE-2 ← Y4                                                                               . . .                                                                             PE-N ← Y2                                MULTIPLY, ACCUMULATE, AND SHIFT UNTIL                                          N-1 ACCUMULATE OPERATIONS ARE COMPLETED.                                       7 PE-1 ← Y1                                                                               PE-2 ← Y2                                                                               . . .                                                                             PE-N ← YN                                8 Y1' = F(ACC1) Y2' = F(ACC2) . . .                                                                             YN' = F(ACCN)                                 9 CONTINUE WITH THE NEXT NETWORK UPDATE CYCLE.                                 __________________________________________________________________________

                                      TABLE 3                                      __________________________________________________________________________     EXPANSION OPTIONS                                                              MULTIPLIER CHIP CONTAINS 16 × 16 MULTIPLIERS SUPPORTING                  16 VERTICAL AND 16 HORIZONTAL SIGMOID ACTIVATION CHIPS                         SIG INPUT # MULTIPLIER CHIPS                                                                           TOTAL # MULTIPLIER                                     TREE STAGES                                                                              PER QUADRANT  CHIPS IN SYSTEM                                                                              N                                        __________________________________________________________________________     1          1             4             32                                      2          4            16             64                                      4         16            64            128                                      6         64            256           256                                      8         256           1024          512                                      10        1024          4096          1024                                     __________________________________________________________________________

                                      TABLE 4                                      __________________________________________________________________________     ARCHITECTURE COMPARISONS                                                                                               PERFORMANCE EXAMPLE                                                            δ.sub.A = δ.sub.bus =                                              1C                                     NETWORK                                                                               HARDWARE         DELAY EQUATION                                                                              N  L = 32                                 __________________________________________________________________________     SYSTOLIC                                                                              N-MULTIPLIERS    Nδ.sub.M + δ.sub.A + δ.sub.S +                               δ.sub.bus                                                                             128                                                                               128δ.sub.M + 2                                                           + δ.sub.S                        RING   N-WT STORAGE w/N WTS          512                                                                               512δ.sub.M + 2                                                           + δ.sub.S                               N-2 to 1 ADDERS               1,024                                                                             1,024δ.sub.M + 3                                                         + δ.sub.S                               N-SIGMOID GENERATORS                                                           1-CIRCULAR BUS                                                          SNAP   N.sup.2 -MULTIPLIERS                                                                            δ.sub.M + 2(log.sub.2 N)C                                                             128delta..sub.S                                                                   δ.sub.M + 14                                                             + δ.sub.S                               N.sup.2 -WT STORAGE w/1 WTS   512                                                                               δ.sub.M + 18                                                             + δ.sub.S                               2N(N-1)-COMMUNICATING         1,024                                                                             δ.sub.M +  20                                                            + δ.sub.S                               ADDERS                                                                         2N-SIGMOID GENERATORS                                                   BIT-   N.sup.2 -MULTIPLIERS                                                                            2(log.sub.2 N)C + 2(L)C + δ.sub.S                                                     128                                                                               78 + δ.sub.S                     SERIAL N.sup.2 -WT STORAGE w/1 WTS   512                                                                               82 + δ.sub.S                     SNAP   2N(N-1)-COMMUNICATING         1,024                                                                             84 + δ.sub.S                            ADDERS                                                                         2N-SIGMOID GENERATOR                                                    SNAP-ROW PERFOR- MANCE                                                                #ROWS(N)-MULTIPLIERS N(#ROWS) WT STORAGE N.sup.2 /(N(#ROWS)) WTS               #ROWS(N-1)-DUAL PATH ADDERS N(#ROWS-1)- COMMUNICATING ADDERS N +               #ROWS SIGMOID GENERATORS                                                                         ##STR3##                                              __________________________________________________________________________ 

We claim:
 1. A scalable neural array processor, comprising a plurality of sets of interconnection structures and activity generators, a portion of said plurality of sets being orthogonal to a remaining portion of said plurality of sets, each said activity generator including means responsive to an output signal from one of said interconnection structures to generate a neuron value.
 2. The neural array processor of claim 1, wherein:said interconnection structure of at least one of said sets includes an adder tree having a first state responsive to a plurality of inputs to generate said output signal and a second state for communicating said neuron value back to said inputs; and wherein said activity generator of said at least one of said sets has a first state, concurrent with said first state of said adder trees, for generating said neuron value and a second state, concurrent with said second state of said adder trees, for communicating said neuron value back to said interconnection structure of said at least one of said sets; and further comprising control means for selectively activating said first and second states of said adder tree and said activity generator of said at least one of said sets. 